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log_{3}(x)-log_{3}(y)=2
log_{6}(2\cdot x)+log_{6}(y+142)=4+log_{6}(4)
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log_2(x+y)-log_2(y-2)=1
2^{x}=2^3\cdot4^{y}
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log_{2}(x)-log_{2}(y)=2
log_{2}(3\cdot x)+log_{2}(y+2)=4+log_{2}(6)
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12log6+ylog36=xlog6
xlog4-2ylog8=\frac{1}3log64
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5log4+ylog16=xlog4
xlog9-2ylog27=\frac{1}3log729
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12log5+ylog25=xlog5
xlog16-2ylog64=\frac{1}5log1048576
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log_6(x+y)-log_6(y-1)=1
6^{x}=6^6\cdot36^{y}
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9log3+ylog9=xlog3
xlog16-2ylog64=\frac{1}2log256
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5log3+ylog9=xlog3
xlog9-2ylog27=\frac{1}5log59049
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11log5+ylog25=xlog5
xlog4-2ylog8=\frac{1}4log256
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11log3+ylog9=xlog3
xlog16-2ylog64=\frac{1}5log1048576
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log_{10}(x)-log_{10}(y)=1
log_{20}(3\cdot x)+log_{20}(y+37)=2+log_{20}(9)
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6log5+ylog25=xlog5
xlog16-2ylog64=\frac{1}3log4096
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log_2(x+y)-log_2(y-6)=1
2^{x}=2^5\cdot8^{y}
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log_{2}(x)-log_{2}(y)=2
log_{4}(4\cdot x)+log_{4}(y+61)=4+log_{4}(12)
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log_{25}(x+16)^{6}-log_5\nthroot{5}{x+16}=1
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log_{3}(x)-log_{3}(y)=1
log_{3}(4\cdot x)+log_{3}(y+2)=2+log_{3}(4)
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4log4+ylog16=xlog4
xlog16-2ylog64=\frac{1}2log256
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log_5(x+y)-log_5(y-3)=1
5^{x}=5^3\cdot125^{y}
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log_{9}(x+7)^{6}-log_3\nthroot{3}{x+7}=1
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log_{5}(x)-log_{5}(y)=3
log_{5}(3\cdot x)+log_{5}(y+23)=5+log_{5}(6)
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log_{4}(x+5)^{2}-log_2\nthroot{3}{x+5}=1
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log_{5}(x)-log_{5}(y)=2
log_{5}(2\cdot x)+log_{5}(y+24)=4+log_{5}(2)
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log_{3}(x)-log_{3}(y)=1
log_{9}(4\cdot x)+log_{9}(y+26)=2+log_{9}(4)
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